Local distinguishability of orthogonal quantum states with multiple copies of 2 ⊗ 2 maximally entangled states

For general quantum systems, many sets of locally indistinguishable orthogonal quantum states have been constructed so far. However, it is interesting how much entanglement resources are sufficient and/or necessary to distinguish these states by local operations and classical communication (LOCC). Here we first present a method to locally distinguish a set of orthogonal product states in $5\ensuremath{\bigotimes}5$ by using two copies of $2\ensuremath{\bigotimes}2$ maximally entangled states. Then we generalize the distinguishing method for a class of orthogonal product states in $d\ensuremath{\bigotimes}d$ ($d$ is odd). Furthermore, for a class of nonlocality of orthogonal product states in $d\ensuremath{\bigotimes}d$ ($d\ensuremath{\ge}5$), we prove that these states can be distinguished by LOCC with two copies of $2\ensuremath{\bigotimes}2$ maximally entangled states. Finally, for some multipartite orthogonal product states, we also present a similar method to locally distinguish these states with multiple copies of $2\ensuremath{\bigotimes}2$ maximally entangled states. These results also reveal the phenomenon of less nonlocality with more entanglement.

[1]  Charles H. Bennett,et al.  Communication via one- and two-particle operators on Einstein-Podolsky-Rosen states. , 1992, Physical review letters.

[2]  Debbie W. Leung,et al.  Quantum data hiding , 2002, IEEE Trans. Inf. Theory.

[3]  John Watrous,et al.  Bipartite subspaces having no bases distinguishable by local operations and classical communication. , 2005, Physical review letters.

[4]  Scott M. Cohen Local distinguishability with preservation of entanglement , 2007 .

[5]  Somshubhro Bandyopadhyay,et al.  Entanglement cost of nonlocal measurements , 2008, 0809.2264.

[6]  Somshubhro Bandyopadhyay,et al.  More nonlocality with less purity. , 2011, Physical review letters.

[7]  Michael Nathanson Distinguishing bipartitite orthogonal states using LOCC: Best and worst cases , 2005 .

[8]  Somshubhro Bandyopadhyay,et al.  LOCC distinguishability of unilaterally transformable quantum states , 2011, 1102.0841.

[9]  Runyao Duan,et al.  Locally indistinguishable subspaces spanned by three-qubit unextendible product bases , 2007, 0708.3559.

[10]  Somshubhro Bandyopadhyay,et al.  Entanglement cost of two-qubit orthogonal measurements , 2010, 1005.5236.

[11]  Peter W. Shor,et al.  Polynomial-Time Algorithms for Prime Factorization and Discrete Logarithms on a Quantum Computer , 1995, SIAM Rev..

[12]  Asif Shakeel,et al.  Local distinguishability of generic unentangled orthonormal bases , 2016 .

[13]  Somshubhro Bandyopadhyay,et al.  Entanglement, mixedness, and perfect local discrimination of orthogonal quantum states , 2011, 1112.3437.

[14]  Zhu-Jun Zheng,et al.  Nonlocality of orthogonal product basis quantum states , 2014, 1509.06927.

[15]  Vedral,et al.  Local distinguishability of multipartite orthogonal quantum states , 2000, Physical review letters.

[16]  Scott M. Cohen Understanding entanglement as resource: locally distinguishing unextendible product bases , 2007, 0708.2396.

[17]  Bin Liu,et al.  QKD-based quantum private query without a failure probability , 2015, 1511.05267.

[18]  Alessandro Cosentino,et al.  Positive-partial-transpose-indistinguishable states via semidefinite programming , 2012, 1205.1031.

[19]  C. H. Bennett,et al.  Quantum nonlocality without entanglement , 1998, quant-ph/9804053.

[20]  L. Hardy,et al.  Nonlocality, asymmetry, and distinguishing bipartite states. , 2002, Physical review letters.

[21]  P. Shor,et al.  Unextendible Product Bases, Uncompletable Product Bases and Bound Entanglement , 1999, quant-ph/9908070.

[22]  Fei Gao,et al.  Entanglement as a resource to distinguish orthogonal product states , 2016, Scientific Reports.

[23]  Fei Gao,et al.  Quantum nonlocality of multipartite orthogonal product states , 2016 .

[24]  Laura Mančinska,et al.  A Framework for Bounding Nonlocality of State Discrimination , 2012, Communications in Mathematical Physics.

[25]  Heng Fan,et al.  Distinguishing bipartite states by local operations and classical communication , 2007 .

[26]  N. J. Cerf,et al.  Multipartite nonlocality without entanglement in many dimensions , 2006 .

[27]  Yuan Feng,et al.  Distinguishability of Quantum States by Separable Operations , 2007, IEEE Transactions on Information Theory.

[28]  H. Fan Distinguishability and indistinguishability by local operations and classical communication. , 2004, Physical review letters.

[29]  Keqin Feng,et al.  Unextendible product bases and 1-factorization of complete graphs , 2006, Discret. Appl. Math..

[30]  A. Winter,et al.  Distinguishability of Quantum States Under Restricted Families of Measurements with an Application to Quantum Data Hiding , 2008, 0810.2327.

[31]  Charles H. Bennett,et al.  Teleporting an unknown quantum state via dual classical and Einstein-Podolsky-Rosen channels. , 1993, Physical review letters.

[32]  M. Horodecki,et al.  Local indistinguishability: more nonlocality with less entanglement. , 2003, Physical review letters.

[33]  Ping Xing Chen,et al.  Distinguishing the elements of a full product basis set needs only projective measurements and classical communication , 2004 .

[34]  Fei Gao,et al.  Practical quantum private query with better performance in resisting joint-measurement attack , 2016 .

[35]  Somshubhro Bandyopadhyay,et al.  Entanglement as a resource for local state discrimination in multipartite systems , 2015, 1510.02443.

[36]  Fei Gao,et al.  Nonlocality of orthogonal product states , 2015 .

[37]  Ozencc Gungor,et al.  Entanglement-assisted state discrimination and entanglement preservation , 2016 .

[38]  Fei Gao,et al.  Postprocessing of the Oblivious Key in Quantum Private Query , 2014, IEEE Journal of Selected Topics in Quantum Electronics.

[39]  M. Ying,et al.  Four locally indistinguishable ququad-ququad orthogonal maximally entangled states. , 2011, Physical review letters.